modul 1 add maths 07

MODUL BIMBINGAN EMaS 2007 ADDITIONAL MATHEMATICS FORM 4
2007 All Rights Reserved JABATAN PELAJARAN TERENGGANU 1
ADDITIONAL MATHEMATICS
FORM 4
MODULE 1
FUNCTIONS
SIMULTANEOUS EQUATIONS
PANEL
EN. KAMARUL ZAMAN BIN LONG – SMK SULTAN SULAIMAN, K. TRG.
EN. MOHD. ZULKIFLI BIN IBRAHIM – SMK KOMPLEKS MENGABANG TELIPOT, K. TRG
EN. OBAIDILLAH BIN ABDULLAH – SM TEKNIK TERENGGANU, K. TRG
PUAN NORUL HUDA BT. SULAIMAN – SM SAINS KUALA TERENGGANU, K. TRG.
PUAN CHE ZAINON BT. CHE AWANG – SBP INTEGRASI BATU RAKIT, K. TRG.
MODUL KECEMERLANGAN AKADEMIK
TERENGGANU TERBILANG 2007
PROGRAM PRAPEPERIKSAAN SPM

1 FUNCTIONS
 PAPER 1
1 A relation from set P = {6, 7, 8, 9} to set Q = {0, 1, 2, 3, 4} is defined by ‘subtract by 5 from’.
State
(a) the object of 1 and 4,
(b) the range of the relation.
Answer : (a)…………………………
(b)…………………………
2 The arrow diagram below shows the relation between Set A and Set B.
Set A Set B
State
(a) the range of the relation,
(b) the type of the relation.
Answer : (a)…………………………
(b)…………………………
3 The function f is defined by f : x  2 – mx and f 1
(8) = 2, find the value of m.
Answer : m = ………………………….









3
2
1
1
16
12
9
4
1

4 Given the function : 3 4f x x  , find the value of m if 1
(2 1) .f m m
 
Answer : m = ………………………….
5 Given the functions : 2 4f x x  and
10
: , 2,
2
fg x x
x
 

find
(a) the function g,
(b) the values of x when the function g mapped onto itself.
Answer : (a)…………………………
(b)…………………………
6 The function f is defined by : ,
3
x a
f x x h
x

 

. Given that 1
(2) 8f 
 ,
Find
(a) the value of h,
(b) the value of a.
Answer : (a) h = ………………………
(b) a = ………………………

7 Given the functions : 2f x x  and 2
:g x mx n  . If the composite function fg is given by
2
: 3 12 8gf x x x  , find
(a) the values of m and n,
(b) 2
( 1)g  .
Answer : (a) m = ………………………
n = ………………………
(b)……………………………..
8 Given the functions :f x px q  where p > 0 and 2
4 9:f x x  , find
(a) the values of p and q,
(b) 1
f 
(5).
Answer : (a) p = ………………………
q = ………………………
(b)……………………………..
9 If
4
: , 3
3
f x x
x
 

, : 3gf x x  and
4 3
: ,
3 5 5
fh x x
x
 

, find
(a) the function g,
(b) the function h.
Answer : (a)…………………………
(b)…………………………

10 Given the function f : 7 2 .x x  Find
(a) the range of f corresponds to the domain 1 3x  ,
(b) the value of x that maps onto itself.
Answer : (a)…………………………
(b) x = .……………………
11 Given the function  xxf 3: p and 1 5
: 2
3
f x qx
  , where p and q are constants. Find the
values of p and q.
Answer : (a) p = ……………………
(b) q = ……………………
12 Given : 4 3f x x   , find
(a) the image of –3,
(b) the object which has the image of 5.
Answer : (a)…………………………
(b)…………………………

13 The diagram below shows the mapping for the function 1
f and g.
`
Given that f (x) = ax + b and g(x) =
b
x
a
, calculate the value of a and b.
Answer : a = …………………………
b = …………………………
14 Given that :h x  | 5x – 2 |, find
(a) the object of 6,
(b) the image which has the object –2.
Answer : (a)…………………………
(b)…………………………
15 Given that xxf 23:  and 1)( 2
xxg , find
(a) f g(x),
(b) g f(–1).
Answer : (a)…………………………
(b)…………………………
●
●
●
1
f
g
2
6
4

 PAPER 2
16 The above diagram shows part of the function rqxpxxf  2
)( .
Find
(a) the values of p, q and r,
(b) the values of x which map onto itself under the function f.
17 Given that functions f and g are defined as 2
: xxf  and :g x ax b  where a and b are
constants.
(a) Given that f(1) = g(1) and f(3) = g(5), find the values of a and b.
(b) With the values a and b obtained from (a), find gg(x) and g1
.
.
18 Given v(x) = 3x – 6 and w(x) = 6x – 1, find
(a) vw1
(x),
(b) values of x so that vw(2x) = x.
19 Given that the function
2
1
:


x
xf , and the composite function 162: 21

xxxgf , find
(a) the function of g (x),
(b) g f (3),
(c) f 2
(x).
20 Given that : 3 2f x x  and : 1
5
x
g x   , find
(a) f 1
(x),
(b) f 1
g (x),
(c) h(x) such that hg(x) = 2x + 6.






x f (x)
2
1
0
10
1
4

4 SIMULTANEOUS EQUATIONS
 PAPER 2
1 Solve the equation 4x + y + 8 = x2
+ x – y = 2.
2 Solve the simultaneous equations
qp
1
3
2
 = 2 and 3p + q = 3.
3 Solve the equation x2
– y + y2
= 2x + 2y = 10.
4 Solve the simultaneous equations and give your answers correct to three decimal places,
2m + 3n + 1 = 0,
m2
+ 6mn + 6 = 0.
1
3
x y = 3 and y2
– 1 = 2x.
6 Given (1, 2k) is the solution of the simultaneous equation
x2
+ py – 29 = 4 = px – xy, where k and p are constants. Find the values of k and p.
3 0
3 2
x y
   and
3 2 1
0
2x y
  
8 Given (2k, 4p) is the solution of the simultaneous equations x – 3y = 4 and
9 7
4x y
 = 1.
Find the values of k and p.
9 Given the following equations :
A = x + y
B = 2x – 14
C = xy – 9
Find the values of x and y such that 3A = B = C

10 Solve the simultaneous equations and give your answers correct to four significant figures,
x + 2y = 2
2y2
– xy – 7 = 0
11 The straight line 3y = 1 – 2x intersects the curve y2
3x2
= 4xy – 6 at two points. Find the
coordinates of the points.
12 If x = 2 and y = 1 are the solutions to the simultaneous equations ax + b2
y = 2 and
2 2
1
2
b
x ay  ,
find the values of a and b.
13 The perimeter of a rectangle is 34 cm and the length of its diagonal is 13 cm. Find the length and
width of the rectangle.
14 The difference between two numbers is 8. The sum of the squares and the product of the numbers
is 19. Find the two numbers.
15 A piece of wire of length 24 cm is cut into two pieces, with one piece bent to form a square ABCD
and the other bent to form a right-angled triangle PQR. The diagram below shows the dimensions of
the two geometrical shapes formed.
The total area of two shapes is 15 cm2
,
(a) show that 6x + y = 21 and 2x2
+ y(x + 1) = 30.
(b) Find the value of x and y.
x cm
A
(x + 1) cm
y cm
B
x cm (x + 2) cm
P
D RC S

modul 1 add maths 07

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